Abstract
We give explicit combinatorial product formulas for the parabolic Kazhdan–Lusztig R-polynomials of Hermitian symmetric pairs. Our results imply that all the roots of these polynomials are (either zero or) roots of unity, and complete those in [F. Brenti, Kazhdan–Lusztig and R-polynomials, Young's lattice, and Dyck partitions, Pacific J. Math. 207 (2002) 257–286] on Hermitian symmetric pairs of type A. As an application of our results, we derive explicit combinatorial product formulas for certain sums and alternating sums of ordinary Kazhdan–Lusztig R-polynomials.
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